Best approximations for the weighted combination of the Cauchy--Szeg\"o kernel and its derivative in the mean
Abstract
In this paper, we study an extremal problem concerning best approximation in the Hardy space H1 on the unit disk D. Specifically, we consider weighted combinations of the Cauchy-Szeg\"o kernel and its derivative, parametrized by an inner function and a complex number λ, and provide explicit formula of the best approximation e,z(λ) by the subspace H10. We also describe the extremal functions associated with this approximation.
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